ax-mp
axresscn
ax1ne0
axcnex
axaddopr
axmulopr
axmulcom
axaddcl
axmulcl
axdistr
axnegex
axrecex
ax1id
axaddrcl
axmulrcl
axrnegex
sseli
sselii
syl
elimhyp
neeq1
mp2
xpex
fex
3eqtr4d
3coml
sylan
3impa
3adant1
3adant2
opreq12d
mp2an
recnt
recn
recnd
elimne0
addex
mulex
adddirt
addcl
mulcl
axaddcom
axaddass
axmulass
ax1re
axi2m1
ax0id
axicn
mp3an
eqeltrr
eqtr
addcom
mulcom
addass
mulass
adddi
adddir
1cn
0cn
addid1
addid2
impbi
mp3an3
eqeq12d
mpan2
opreq2
syl5bir
adantr
mpan
eqeq1d
opreq1
syl6eq
syl6bi
imp
sylibd
ex
r19.23aiv
bitr
eqeq12i
dedth3h
bibi1d
eqeq1
bibi12d
eqeq2d
eqeq2
elimel
3adant3
bitr3d
mulid1
mulid2
negex
recex
readdcl
remulcl
addcan
addcan2
addcant
addcan2t
3eqtr3d
opreq1d
3com12
opreq2d
3com23
3expa
adantrr
3expb
an4s
eqtrd
ad2ant2l
pm3.2i
opreq2i
add12t
add23t
add4t
add42t
add12
add23
add4
add42
addid2t
peano2cn
mpbir2an
reu4
risset
sylib
mp3an13
eqcomd
sylan9eqr
exp32
impcom
a1d
r19.21aiv
r19.22
syl6
mpid
eqtr3t
syl5bi
mp3an1
rgen2
peano2re
negeu
subval
df-neg
ax-17
3eqtr4g
negeq
negeqi
negeqd
3imtr4
hbopr
eleq2i
albii
hbneg
eqeltr
oprex
minusex
reucl
dedth2h
eleq1d
syl5eqel
reuuni1
eqeq1i
syl6rbbr
vtoclga
subcl
subclt
negclt
negcl
subadd
3bitr4
mpbii
eqid
pm3.27
pm3.26
ancoms
syl3anc
syl5eq
eqcomi
3eqtr
mpbir
syl3an3
3eqtrd
syl5
exp3a
com12
3imp
subsub23
subaddt
pncan3t
pncan3
negidt
negid
negsub
negsubt
addsubasst
addsubt
3eqtr3
opreq1i
eqtr3
dedth
id
eqtr3d
sylan2
adantl
opreq12
anidms
addsub12t
addsubass
addsub
2addsubt
negneg
subid
subid1
negnegt
subnegt
subidt
anabsan2
3simp2
3simp3
sylbir
3eqtr3g
3bitr
subid1t
pncant
pncan2t
npcant
npncant
nppcant
subneg
subeq0
neg11
3bitr3
eqcom
syl6bb
3bitr3d
syl3an2
negcon1
negcon2
neg11t
negcon1t
negcon2t
subcant
subcan2t
subcan
subcan2
subeq0t
df-rex
mpbi
mp3an12
syl5bb
eleq1a
sylbird
19.23aiv
eqeltrrd
syl2an
neg0
renegcl
renegclt
resubclt
resubcl
0re
adantrl
ad2ant2r
adantll
anandirs
adantlr
an42s
mulid2t
mul12t
mul23t
mul4t
muladdt
mp3an2
muladd11t
mul12
mul23
mul4
muladd
